Trisections and Lefschetz fibrations with (-n)-sections

Abstract

Castro and Ozbagci constructed a trisection of a closed 4-manifold admitting a Lefschetz fibration with a (-1)-section such that the corresponding trisection diagram can be explicitly constructed from a monodromy of the Lefschetz fibration. In this paper, for a closed 4-manifold X admitting an achiral Lefschetz fibration with a (-n)-section, we construct a trisection of X \# nCP2 if n is positive and X \# (-n)CP2 if n is negative such that the corresponding trisection diagram can be explicitly constructed from a monodromy of the Lefschetz fibration. We also construct a trisection of the fiber sum of two achiral Lefschetz fibrations with n- and (-n)-sections such that the corresponding trisection diagram can be explicitly constructed from monodromies of the Lefschetz fibrations.

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